Transcript stacks

Stacks
© 2010 Goodrich, Tamassia
Stacks
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Abstract Data Types (ADTs)
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An abstract data
type (ADT) is an
abstraction of a
data structure
An ADT specifies:
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Data stored
Operations on the
data
Error conditions
associated with
operations
© 2010 Goodrich, Tamassia
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Example: ADT modeling a
simple stock trading system
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The data stored are buy/sell
orders
The operations supported are
 order buy(stock, shares, price)
 order sell(stock, shares, price)
 void cancel(order)
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Error conditions:
 Buy/sell a nonexistent stock
 Cancel a nonexistent order
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The Stack ADT
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The Stack ADT stores
arbitrary objects
Insertions and deletions
follow the last-in first-out
scheme
Think of a spring-loaded
plate dispenser
Main stack operations:
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push(object): inserts an
element
object pop(): removes and
returns the last inserted
element
© 2010 Goodrich, Tamassia
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Auxiliary stack
operations:
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object top(): returns the
last inserted element
without removing it
integer size(): returns the
number of elements
stored
boolean isEmpty():
indicates whether no
elements are stored
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Stack Interface in Java
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public interface Stack<E> {
Java interface
corresponding to
public int size();
our Stack ADT
public boolean isEmpty();
Requires the
public E top()
definition of class
throws EmptyStackException;
EmptyStackException
public void push(E element);
Different from the
built-in Java class
public E pop()
java.util.Stack
throws EmptyStackException;
}
© 2010 Goodrich, Tamassia
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Exceptions
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Attempting the
execution of an
operation of ADT may
sometimes cause an
error condition, called
an exception
Exceptions are said to
be “thrown” by an
operation that cannot
be executed
© 2010 Goodrich, Tamassia
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In the Stack ADT,
operations pop and
top cannot be
performed if the
stack is empty
Attempting the
execution of pop or
top on an empty
stack throws an
EmptyStackException
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Applications of Stacks
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Direct applications
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Page-visited history in a Web browser
Undo sequence in a text editor
Chain of method calls in the Java Virtual
Machine
Indirect applications
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Auxiliary data structure for algorithms
Component of other data structures
© 2010 Goodrich, Tamassia
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Method Stack in the JVM
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The Java Virtual Machine (JVM) main() {
keeps track of the chain of
int i = 5;
active methods with a stack
foo(i);
When a method is called, the
}
JVM pushes on the stack a
foo(int j) {
frame containing
int k;
 Local variables and return value
 Program counter, keeping track of
k = j+1;
the statement being executed
bar(k);
When a method ends, its frame
}
is popped from the stack and
control is passed to the method bar(int m) {
on top of the stack
…
}
Allows for recursion
© 2010 Goodrich, Tamassia
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bar
PC = 1
m=6
foo
PC = 3
j=5
k=6
main
PC = 2
i=5
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Array-based Stack
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A simple way of
implementing the
Stack ADT uses an
array
We add elements
from left to right
A variable keeps
track of the index of
the top element
Algorithm size()
return t + 1
Algorithm pop()
if isEmpty() then
throw EmptyStackException
else
tt1
return S[t + 1]
…
S
0 1 2
© 2010 Goodrich, Tamassia
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Array-based Stack (cont.)
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The array storing the
stack elements may
become full
A push operation will
then throw a
FullStackException
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Algorithm push(o)
if t = S.length  1 then
throw FullStackException
else
tt+1
Limitation of the arrayS[t]  o
based implementation
Not intrinsic to the
Stack ADT
…
S
0 1 2
© 2010 Goodrich, Tamassia
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Performance and Limitations
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Performance
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Let n be the number of elements in the stack
The space used is O(n)
Each operation runs in time O(1)
Limitations
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The maximum size of the stack must be defined a
priori and cannot be changed
Trying to push a new element into a full stack
causes an implementation-specific exception
© 2010 Goodrich, Tamassia
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Array-based Stack in Java
public class ArrayStack<E>
implements Stack<E> {
public E pop()
throws EmptyStackException {
if isEmpty()
throw new EmptyStackException
(“Empty stack: cannot pop”);
E temp = S[top];
// facilitate garbage collection:
S[top] = null;
top = top – 1;
return temp;
}
// holds the stack elements
private E S[ ];
// index to top element
private int top = -1;
// constructor
public ArrayStack(int capacity) {
S = (E[]) new Object[capacity]);
}
… (other methods of Stack interface)
© 2010 Goodrich, Tamassia
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Example use in Java
public class Tester {
// … other methods
public intReverse(Integer a[]) {
Stack<Integer> s;
s = new ArrayStack<Integer>();
… (code to reverse array a) …
public floatReverse(Float f[]) {
Stack<Float> s;
s = new ArrayStack<Float>();
… (code to reverse array f) …
}
}
© 2010 Goodrich, Tamassia
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Parentheses Matching
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Each “(”, “{”, or “[” must be paired with
a matching “)”, “}”, or “[”
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correct: ( )(( )){([( )])}
correct: ((( )(( )){([( )])}
incorrect: )(( )){([( )])}
incorrect: ({[ ])}
incorrect: (
© 2010 Goodrich, Tamassia
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Parentheses Matching Algorithm
Algorithm ParenMatch(X,n):
Input: An array X of n tokens, each of which is either a grouping symbol, a
variable, an arithmetic operator, or a number
Output: true if and only if all the grouping symbols in X match
Let S be an empty stack
for i=0 to n-1 do
if X[i] is an opening grouping symbol then
S.push(X[i])
else if X[i] is a closing grouping symbol then
if S.isEmpty() then
return false {nothing to match with}
if S.pop() does not match the type of X[i] then
return false {wrong type}
if S.isEmpty() then
return true {every symbol matched}
else return false {some symbols were never matched}
© 2010 Goodrich, Tamassia
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HTML Tag Matching
For fully-correct HTML, each <name> should pair with a matching </name>
<body>
<center>
<h1> The Little Boat </h1>
</center>
<p> The storm tossed the little
boat like a cheap sneaker in an
old washing machine. The three
drunken fishermen were used to
such treatment, of course, but
not the tree salesman, who even as
a stowaway now felt that he
had overpaid for the voyage. </p>
<ol>
<li> Will the salesman die? </li>
<li> What color is the boat? </li>
<li> And what about Naomi? </li>
</ol>
</body>
© 2010 Goodrich, Tamassia
The Little Boat
The storm tossed the little boat
like a cheap sneaker in an old
washing machine. The three
drunken fishermen were used to
such treatment, of course, but not
the tree salesman, who even as
a stowaway now felt that he had
overpaid for the voyage.
1. Will the salesman die?
2. What color is the boat?
3. And what about Naomi?
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Tag Matching Algorithm (in Java)
import java.io.*;
import java.util.Scanner;
import net.datastructures.*;
/** Simplified test of matching tags in an HTML document. */
public class HTML {
/** Strip the first and last characters off a <tag> string. */
public static String stripEnds(String t) {
if (t.length() <= 2) return null;
// this is a degenerate tag
return t.substring(1,t.length()-1);
}
/** Test if a stripped tag string is empty or a true opening tag. */
public static boolean isOpeningTag(String tag) {
return (tag.length() == 0) || (tag.charAt(0) != '/');
}
© 2010 Goodrich, Tamassia
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Tag Matching Algorithm (cont.)
/** Test if stripped tag1 matches closing tag2 (first character is '/'). */
public static boolean areMatchingTags(String tag1, String tag2) {
return tag1.equals(tag2.substring(1)); // test against name after '/'
}
/** Test if every opening tag has a matching closing tag. */
public static boolean isHTMLMatched(String[] tag) {
Stack<String> S = new NodeStack<String>(); // Stack for matching tags
for (int i = 0; (i < tag.length) && (tag[i] != null); i++) {
if (isOpeningTag(tag[i]))
S.push(tag[i]); // opening tag; push it on the stack
else {
if (S.isEmpty())
return false;
// nothing to match
if (!areMatchingTags(S.pop(), tag[i]))
return false; // wrong match
}
}
if (S.isEmpty()) return true; // we matched everything
return false; // we have some tags that never were matched
}
© 2010 Goodrich, Tamassia
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Tag Matching Algorithm (cont.)
public final static int CAPACITY = 1000; // Tag array size
/* Parse an HTML document into an array of html tags */
public static String[] parseHTML(Scanner s) {
String[] tag = new String[CAPACITY]; // our tag array (initially all null)
int count = 0;
// tag counter
String token;
// token returned by the scanner s
while (s.hasNextLine()) {
while ((token = s.findInLine("<[^>]*>")) != null) // find the next tag
tag[count++] = stripEnds(token); // strip the ends off this tag
s.nextLine(); // go to the next line
}
return tag; // our array of (stripped) tags
}
public static void main(String[] args) throws IOException { // tester
if (isHTMLMatched(parseHTML(new Scanner(System.in))))
System.out.println("The input file is a matched HTML document.");
else
System.out.println("The input file is not a matched HTML document.");
}
}
© 2010 Goodrich, Tamassia
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Evaluating Arithmetic
Expressions
Slide by Matt Stallmann
included with permission.
14 – 3 * 2 + 7 = (14 – (3 * 2) ) + 7
Operator precedence
* has precedence over +/–
Associativity
operators of the same precedence group
evaluated from left to right
Example: (x – y) + z rather than x – (y + z)
Idea: push each operator on the stack, but first pop and
perform higher and equal precedence operations.
© 2010 Stallmann
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Algorithm for
Evaluating Expressions
Two stacks:
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opStk holds operators
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valStk holds values
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Use $ as special “end of input”
token with lowest precedence
Algorithm doOp()
x  valStk.pop();
y  valStk.pop();
op  opStk.pop();
valStk.push( y op x )
Algorithm repeatOps( refOp ):
while ( valStk.size() > 1 
prec(refOp) ≤
prec(opStk.top())
doOp()
© 2010 Stallmann
Slide by Matt Stallmann
included with permission.
Algorithm EvalExp()
Input: a stream of tokens representing
an arithmetic expression (with
numbers)
Output: the value of the expression
while there’s another token z
if isNumber(z) then
valStk.push(z)
else
repeatOps(z);
opStk.push(z)
repeatOps($);
return valStk.top()
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Algorithm on an
Example Expression
Slide by Matt Stallmann
included with permission.
Operator ≤ has lower
precedence than +/–
14 ≤ 4 – 3 * 2 + 7
4
14
–
≤
3
4
14
*
–
≤
$
7
-2
14
+
2
3
4
14
*
–
≤
© 2010 Stallmann
2
3
4
14
+
*
–
≤
6
4
14
–
≤
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14
$
$
+
≤
5
14
F
≤
+
≤
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Computing Spans (not in book)
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7
Using a stack as an auxiliary
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data structure in an algorithm
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Given an an array X, the span
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S[i] of X[i] is the maximum
3
number of consecutive
2
elements X[j] immediately
preceding X[i] and such that 1
0
X[j]  X[i]
Spans have applications to
financial analysis
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E.g., stock at 52-week high
© 2010 Goodrich, Tamassia
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X
S
1
6
1
3
1
2
3
4
2
5
3
4
2
1
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Quadratic Algorithm
Algorithm spans1(X, n)
Input array X of n integers
Output array S of spans of X
S  new array of n integers
for i  0 to n  1 do
s1
while s  i  X[i  s]  X[i]
ss+1
S[i]  s
return S
#
n
n
n
1 + 2 + …+ (n  1)
1 + 2 + …+ (n  1)
n
1
Algorithm spans1 runs in O(n2) time
© 2010 Goodrich, Tamassia
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Computing Spans with a Stack
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We keep in a stack the
indices of the elements
visible when “looking
back”
We scan the array from
left to right
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Let i be the current index
We pop indices from the
stack until we find index j
such that X[i]  X[j]
We set S[i]  i  j
We push x onto the stack
© 2010 Goodrich, Tamassia
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6
5
4
3
2
1
0
0 1 2 3 4 5 6 7
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Linear Algorithm
Each index of the
array
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Is pushed into the
stack exactly one
Is popped from
the stack at most
once
The statements in
the while-loop are
executed at most
n times
Algorithm spans2
runs in O(n) time
© 2010 Goodrich, Tamassia
Algorithm spans2(X, n)
#
S  new array of n integers n
A  new empty stack
1
for i  0 to n  1 do
n
while (A.isEmpty() 
X[A.top()]  X[i] ) do n
A.pop()
n
if A.isEmpty() then
n
S[i]  i + 1
n
else
S[i]  i  A.top()
n
A.push(i)
n
return S
1
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